May 28, 2021 - CSAT Quiz

1.  A rabbit on a controlled diet is fed daily 300 grams of a mixture of two foods, food X and food Y. Food X contains 10 percent protein and food Y contains 15 percent protein. If the rabbits diet provides exactly 38 grams of protein daily, how many grams of food X are in the mixture?. (a) 100 (b) 140 (c) 150 (d) 160   2. In how many different ways can the letters of the word "CORPORATION" be arranged in such a way that no two vowels are together? (a) 50400 (b) 5040 (c) 144800 (d) 1080   3. From a group of 7 men and 6 women, five persons are to be selected to form a committee so that at least 3 men are there on the committee. In how many ways can it be done?. (a) 256 (b) 756 (c) 956 (d) 456   4. In how many ways can 5 examination papers be arranged so that the best and the worst papers never come together? (a) 72 (b) 144 (c) 20 (d) 15   5. If a code word is defined to be a sequence of different letters chosen from the 10 letters A, B, C, D, E, F, G, H, I, and J, what is the ratio of the number of 5-letter code words to the number of 4-letter code words? (a) 1 : 6 (b) 6 : 1 (c) 5 : 1 (d) 1 : 5   Answers 1 – (b) x= mixture A ,, then 300-x is Mixture B 0.1 x + (300-x)0.15=38 x=140   2 – (a)  Vowels in the word "CORPORATION" are O,O,A,I,O Lets make it as CRPRTN(OOAIO) This has 7 letters, where R is twice so value = 7!/2! = 2520 Vowel O is 3 times, so vowels can be arranged = 5!/3! = 20 Total number of words = 2520 * 20 = 50400   3 – (b) Since at least 3 men must be chosen, we consider all committees which include 3, 4, and 5 men, with 2, 1, and 0 women, respectively. That is, we want to add the number of ways to: a. Choose 3 from 7 men and 2 from 6 women = (7C3)*(6C2) = 35*15 = 525 b. Choose 4 from 7 men and 1 from 6 women = (7C4)*(6C1) = 35*6 = 210 c. Choose 5 from 7 men and 0 from 6 women = (7C5)*(6C0) = 21*1 = 21 a+b+c= 756.    4 – (a) No. of ways in which 5 paper can arranged is 5! Ways. When the best and the worst papers come together, regarding the two as one paper, we have only 4 papers. These 4 papers can be arranged in 4! Ways. And two papers can be arranged themselves in 2! Ways. No. of arrangement when best and worst paper do not come together, = 5!- 4!.2! = 4!(5-2) = 24 x 3 = 72. (n-2)(n-1)! = (5-2)(5-1) = 72   5 – (b) Numbers of Options applicable for 5 letter digit -> 10987610∗9∗8∗7∗6 ( as option pool for first digit is 10, for second 9 because one is removed and so on) Numbers of Options applicable for 5 letter digit -> 1098710∗9∗8∗7 Required Ratio -> (109876)/(10987)(10∗9∗8∗7∗6)/(10∗9∗8∗7) = 6:1


POSTED ON 28-05-2021 BY ADMIN
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